Aim
Learning Gromov-Witten theory from several different aspects. For details, see syllabus.
Time and Place
Time: Every Tuesday 09:50-11:25 (From Feb 28th)
Place: Ning Zhai(宁斋) S11
Prerequisite
Algebraic geometry and symplectic geometry.
Syllabus
We will cover following topics in Gromov-Witten theory
- Gromov-Witten/Pandharipande-Thomas correspondence (Nantao Zhang)
- Gromov-Witten theory and topological recursion (Jinghao Yu)
- The equivariant Gromov-Witten theory of \(\mathbb{P}^{1}\) (Weilin Su)
- Graph sum formula of \(\mathbb{C}^{n} / G\) (Zhuoming Lan)
Four speakers will take turns to discuss the topics.
A tentative schedule
| Time | Speaker | Title |
|---|---|---|
| 02-28 | Nantao Zhang | GW/PT correspondence I |
| 03-07 | Jinghao Yu | Topological recursion I |
| 03-14 | Weilin Su | Equivariant GW theory I |
| 03-21 | Zhuoming Lan | Graph sum formula I |
| 03-28 | Nantao Zhang | GW/PT correspondence II |
| 04-04 | Jinghao Yu | Topological recursion II |
| 04-11 | Weilin Su | Equivariant GW theory II |
| 04-18 | Zhuoming Lan | Graph sum formula II |
| 04-25 | Nantao Zhang | GW/PT correspondence III |
| 05-02 | Cancelled. Happy Labour Day! | |
| 05-09 | Jinghao Yu | Topological recursion III |
| 05-16 | Weilin Su | Equivariant GW theory III |
| 05-23 | Zhuoming Lan | Graph sum formula III |
| 05-30 | Nantao Zhang | GW/PT correspondence IV |
| 06-06 | Jinghao Yu | Topological recursion IV |
Notes
TBA.
References
TBA.
Organizer
Nantao Zhang(张南涛)
You may join with following QR code or contact me by email znt21 (at) mails.tsinghua.edu.cn.
